DT invariants from vertex algebras

TL;DR

This paper links the cohomological Hall algebra of symmetric quivers to vertex algebras, providing new insights into Donaldson--Thomas invariants and the structure of CoHA modules.

Contribution

It introduces a novel interpretation of the cohomological Hall algebra using vertex algebras, revealing new structural and positivity properties.

Findings

Identifies the dual of the cohomological Hall algebra with a vertex algebra

Shows the algebra has a vertex bialgebra structure

Provides a new interpretation of Donaldson--Thomas invariants

Abstract

We obtain a new interpretation of the cohomological Hall algebra $\mathcal{H}_Q$ of a symmetric quiver $Q$ in the context of the theory of vertex algebras. Namely, we show that the graded dual of $\mathcal{H}_Q$ is naturally identified with the underlying vector space of the principal free vertex algebra associated to the Euler form of $Q$. Properties of that vertex algebra are shown to account for the key results about $\mathcal{H}_Q$. In particular, it has a natural structure of a vertex bialgebra, leading to a new interpretation of the product of $\mathcal{H}_Q$. Moreover, it is isomorphic to the universal enveloping vertex algebra of a certain vertex Lie algebra, which leads to a new interpretation of Donaldson--Thomas invariants of $Q$ (and, in particular, re-proves their positivity). Finally, it is possible to use that vertex algebra to give a new interpretation of CoHA modules made of cohomologies of non-commutative Hilbert schemes.